Small Youden Rectangles, Near Youden Rectangles, and Their Connections to Other Row-Column Designs

Discret. Math. Theor. Comput. Sci. Pub Date : 2019-10-07 DOI:10.46298/dmtcs.6754

G. Jäger, K. Markström, Denys Shcherbak, Lars–Daniel Öhman

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Abstract

In this paper we first study $k \times n$ Youden rectangles of small orders. We have enumerated all Youden rectangles for a range of small parameter values, excluding the almost square cases where $k = n-1$, in a large scale computer search. In particular, we verify the previous counts for $(n,k) = (7,3), (7,4)$, and extend this to the cases $(11,5), (11,6), (13,4)$ and $(21,5)$. For small parameter values where no Youden rectangles exist, we also enumerate rectangles where the number of symbols common to two columns is always one of two possible values, differing by 1, which we call \emph{near Youden rectangles}. For all the designs we generate, we calculate the order of the autotopism group and investigate to which degree a certain transformation can yield other row-column designs, namely double arrays, triple arrays and sesqui arrays. Finally, we also investigate certain Latin rectangles with three possible pairwise intersection sizes for the columns and demonstrate that these can give rise to triple and sesqui arrays which cannot be obtained from Youden rectangles, using the transformation mentioned above.

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小约登矩形、近约登矩形及其与其他行列设计的连接

本文首先研究了$k \times n$小阶约登矩形。我们已经为一系列小参数值列举了所有的约登矩形，排除了在大规模计算机搜索中$k = n-1$几乎是方形的情况。特别地，我们将验证$(n,k) = (7,3),(7,4)$的先前计数，并将其扩展到$(11,5), (11,6), (13,4)$和$(21,5)$。对于不存在约登矩形的小参数值，我们也枚举两个矩形，其中两列共有的符号数总是两个可能值中的一个，差为1，我们称之为\emph{近约登矩形}。对于我们生成的所有设计，我们计算了自拓群的阶数，并研究了某个变换在多大程度上优于其他行列设计，即双列阵列、三列阵列和倍列阵列。最后，我们还研究了某些具有三种可能的列对交叉大小的拉丁矩形，并证明这些矩形可以产生三重数组和倍数组，这些数组不能使用上面提到的转换从Youdenrectangles中获得。

本文章由计算机程序翻译，如有差异，请以英文原文为准。

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Discret. Math. Theor. Comput. Sci.

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